There is something about him that really captures me, the gentle smile and eyes, the quiet observation and the manner he explains his ideas. Amazing person, Mr. Wiles is.
Can anyone imagine how does it feel like to study for a degree at Oxford, then 40 years later they name a new building of the department after you, and you go to work there everyday.
He will be remembered for as long as humans are still around and do mathematics. When aliens arrive they will compare their proof and Wiles', and find that they are the same.
After 3 centuries a vietnamese old man solve Fermat in only page and any body can understand it solve Fermat in digital age, just one internet site I think I've found the real face of piere de Fermat in a dreaming math Define Sx=1+2^2+3^2+4^2+....+x^2.=x(x+1)(2x+1)/6=(2x^3+3x^2+x)/6 Sy=1+2^2+3^2+4^2+....+y^2=y(y+1)(2y+1)/6=(2y^3+3y^2+y)/6 Sz=1+2^2+3^2+4^2+....+z^2=z(z+1)(2z+1)/6=(2z^3+3z^2+z)/6 So 2x^3=6Sx-3x^2-x 2y^3=6Sy-3y^2-y 2z^3=6Sz-3z^2-z so x^3=3Sx-3/2x^2-x/2 y^3=3Sy-3/2y^2 - y/2 z^3=3Sz -3/2z^2-z/2 supose x^3+y^3=z^3 3Sx-3/2x^2-x/2+3Sy-3/2y^2 - y/2 - (3Sz -3/2z^2-z/2)=0 or 2Sx-x^2-x/3+2Sy-y^2 - y/3 - (2Sz -z^2-z/3)=0 or 2Sx+2Sy-2Sz-(x^2+y^2-z^2) =(x/3+y/3-z/3) because 2Sx+2Sy-2Sz-(x^2+y^2-z^2) is integer so (x/3+y/3-z/3) is also integer or x=3k y=3h and z=3g K,h,g are integers So 27k^3+27h^3=27g^3. or k^3+h^3=g^3 had had condition x ^ 3 + y ^ 3 = z ^ 3 Unable to meet the two conditions in the same time except x=k,y=h and z=g but x=3k and k=x so x=3x this is impossible conclusive x^3+y^3=/z^3 general Z^n=/x^n+y^n using formular 1^a+2^a+3^a+4^a+....+n^a
Thank you very much You had written How can you assert that 2Sx+2Sy-2Sz-(x^2+y^2-z^2) is integer ? :) 2Sx+2Sy-2Sz-(x^2+y^2-z^2) is integer because Sx=1+2^2+3^2+....+x^2 so it is integer. Similar with Sy and Sz. And condition give x,y,z are integers Old writing have mistake. I am sorry. . I write again which have no mistake. Please read it. Define Sx=1+2^2+3^2+4^2+....+x^2.=x(x+1)(2x+1)/6=(2x^3+3x^2+x)/6 Sy=1+2^2+3^2+4^2+....+y^2=y(y+1)(2y+1)/6=(2y^3+3y^2+y)/6 Sz=1+2^2+3^2+4^2+....+z^2=z(z+1)(2z+1)/6=(2z^3+3z^2+z)/6 So 2x^3=6Sx-3x^2-x 2y^3=6Sy-3y^2-y 2z^3=6Sz-3z^2-z so x^3=3Sx-3/2x^2-x/2 y^3=3Sy-3/2y^2 - y/2 z^3=3Sz -3/2z^2-z/2 supose x^3+y^3=z^3 3Sx-3/2x^2-x/2+3Sy-3/2y^2 - y/2 - (3Sz -3/2z^2-z/2)=0 or 2Sx-x^2-x/3+2Sy-y^2 - y/3 - (2Sz -z^2-z/3)=0 or 2Sx+2Sy-2Sz-(x^2+y^2-z^2) =(x/3+y/3-z/3) Sx+S(x-1)+Sy+S(y-1) -Sz -S(z-1)=(x/3+y/3-z/3) Define the function f(x) is Sx+S(x-1) So f(y)=Sy+S(y-1) f(z)=Sz+S(z-1) And g(x )is x/3 so g(y)=y^3 g(z)=z^3 So f(x)+f(y)-f(z)=g(x)+g(y)-g(z) homogeneous them so f(x)=g(x) But this is wrong So x^3+y^3 impossible =z^3
I don't think you can assert that f(x)+f(y)-f(z)=g(x)+g(y)-g(z) implies that f(x) = g(x) and f(y) = g(y) and f(z) = g(z) :( Yes you right. I am sorry I think and write again completely. Define Sx=1+2^2+3^2+4^2+....+x^2.=x(x+1)(2x+1)/6=(2x^3+3x^2+x)/6 Sy=1+2^2+3^2+4^2+....+y^2=y(y+1)(2y+1)/6=(2y^3+3y^2+y)/6 Sz=1+2^2+3^2+4^2+....+z^2=z(z+1)(2z+1)/6=(2z^3+3z^2+z)/6 So 2x^3=6Sx-3x^2-x 2y^3=6Sy-3y^2-y 2z^3=6Sz-3z^2-z so x^3=3Sx-3/2x^2-x/2 y^3=3Sy-3/2y^2 - y/2 z^3=3Sz -3/2z^2-z/2 supose x^3+y^3=z^3 3Sx-3/2x^2-x/2+3Sy-3/2y^2 - y/2 - (3Sz -3/2z^2-z/2)=0 or 2Sx-x^2-x/3+2Sy-y^2 - y/3 - (2Sz -z^2-z/3)=0 or 2Sx+2Sy-2Sz-(x^2+y^2-z^2) =(x/3+y/3-z/3) So (2Sx+2Sy-2Sz) - (x/3+y/3-z/3)=(x^2+y^2-z^2) this tell that (x^2+y^2-z^2) is a funtion of [ (x/3+y/3-z/3 and (2Sx+2Sy-2Sz)] And a other way to know x^2+y^2-z^2 follow x+y- z because (x+y)^2=x^2+y^2+2xy (x+y-z)^2=(x+y)^2+z^2-2z(x+y)=x^2+y^2+2xy+z^2-2z(x+y=x^2+y^2-z^2+2xy-2z(x+y +3z^2 So (x^2+y^2 - z^2)=(x+y-z)^2+2xy-2z(x+y +3z^2 This tell that (x^2+y^2 - z^2) is a function of [ (x+y-z)^2 and 2xy-2z(x+y +3z^2] (x^2+y^2-z^2) is a funtion of [ (x/3+y/3-z/3 and (2Sx+2Sy-2Sz)] And (x^2+y^2 - z^2) of [ (x+y-z)^2 and 2xy-2z(x+y +3z^2] Can not satify two conditions in a same time. note first function have no xy,zx and zy Second funtion have
Well, I think you're not very sure of your results, trying this and that approach. If you think you are really in the verge of a major result (which would be astonishing, I should say) I advise you to work on that proof carefully and not just throw attempts. ;) This is not a try/error endeavor, or at least not in a youtube comments box, were typically people doesn't have so much free time to work on partial and not so thought results. But hey; go for it.
2:57 man, for a blink moment I thought it was him, thinking like "how could one man possess so much awesomeness"... guess he's awesome enough already. :D
Andrew wiles real genius But i just prove fo happy in math Please read it, that is a short message about Flt Define Sx=1+2^2+3^2+4^2+....+x^2.=x(x+1)(2x+1)/6=(2x^3+3x^2+x)/6 Sy=1+2^2+3^2+4^2+....+y^2=y(y+1)(2y+1)/6=(2y^3+3y^2+y)/6 Sz=1+2^2+3^2+4^2+....+z^2=z(z+1)(2z+1)/6=(2z^3+3z^2+z)/6 So 2x^3=6Sx-3x^2-x 2y^3=6Sy-3y^2-y 2z^3=6Sz-3z^2-z so x^3=3Sx-3/2x^2-x/2 y^3=3Sy-3/2y^2 - y/2 z^3=3Sz -3/2z^2-z/2 suppose x^3+y^3=z^3 3Sx-3/2x^2-x/2+3Sy-3/2y^2 - y/2 - (3Sz -3/2z^2-z/2)=0 or 2Sx-x^2-x/3+2Sy-y^2 - y/3 - (2Sz -z^2-z/3)=0 or 2Sx+2Sy-2Sz-(x^2+y^2-z^2) =(x/3+y/3-z/3) So (2Sx+2Sy-2Sz) - (x/3+y/3-z/3)=(x^2+y^2-z^2) this tell that (x^2+y^2-z^2) is a function of [ (x/3+y/3-z/3 and (2Sx+2Sy-2Sz)] because (x+y)^2=x^2+y^2+2xy (x+y-z)^2=(x+y)^2+z^2-2z(x+y)=x^2+y^2+2xy+z^2-2z(x+y=x^2+y^2-z^2+2xy-2z(x+y +3z^2 So (x^2+y^2 - z^2)=(x+y-z)^2+2xy-2z(x+y +3z^2 This tell that (x^2+y^2 - z^2) is a function of [ (x+y-z)^2 and 2xy-2z(x+y +3z^2] Had had first (x^2+y^2-z^2) is a funtion of [ (x+y-z)/3 and (2Sx+2Sy-2Sz)] and more have another function (x^2+y^2 - z^2) is a funtion of [ (x+y-z)^2 and 2xy-2z(x+y )+3z^2] note first function have no xy,zx and zy Second funtion have. It point out that (x ^ 2 + y ^ 2 - z ^ 2) is not only followas the (x, y and z) but also (x ^ 2 + y ^ 2 - z ^ 2) acording individual x. Cannot satisfy two functions different in a same time on this case.
The Universe has a prime-cofactor quantization superposition cause-effect format, with/to which we respond by/to recognise mathematical concepts, altogether.
There is something about him that really captures me, the gentle smile and eyes, the quiet observation and the manner he explains his ideas. Amazing person, Mr. Wiles is.
One of the great geniuses of our time
The music is an original composition for this short film by Arthur Khayrullin- young Russian composer.
Do you have a link to the song?
@@henrywilliams3919 I'm 3 years late but I've got it if you still want it.
@@rudyardwalker9113 i'd really appreciate it if you'd give a link or something.
@@mariangloser8382 Seems to come from the same artist although I'm not certain if it's the full thing. ruclips.net/video/Ite_9m4xf60/видео.html
If you still have it, can you send me please?
Can anyone imagine how does it feel like to study for a degree at Oxford, then 40 years later they name a new building of the department after you, and you go to work there everyday.
somehow, Andrew Wiles always looked much older than he is in fact.
MrVM1980 thank you, same to you!
Legends walk among us.
The greatest mathematician of our time
Ja
He will be remembered for as long as humans are still around and do mathematics. When aliens arrive they will compare their proof and Wiles', and find that they are the same.
Music please ??
I want to have a last go at Birch Swinnerton Dyer .. my goodness .. ! bow at your feet Sir ..
I had been reading the chapter on Abel in ‘Man of Mathematics’ just when i searched for related videos and found this one.
Can you share please
3:09 !! he is certainly working on some other big, big, problem. :)
After 3 centuries a vietnamese old man solve Fermat in only page and any body can understand it
solve Fermat in digital age, just one internet site
I think I've found the real face of piere de Fermat in a dreaming math
Define
Sx=1+2^2+3^2+4^2+....+x^2.=x(x+1)(2x+1)/6=(2x^3+3x^2+x)/6
Sy=1+2^2+3^2+4^2+....+y^2=y(y+1)(2y+1)/6=(2y^3+3y^2+y)/6
Sz=1+2^2+3^2+4^2+....+z^2=z(z+1)(2z+1)/6=(2z^3+3z^2+z)/6
So
2x^3=6Sx-3x^2-x
2y^3=6Sy-3y^2-y
2z^3=6Sz-3z^2-z
so
x^3=3Sx-3/2x^2-x/2
y^3=3Sy-3/2y^2 - y/2
z^3=3Sz -3/2z^2-z/2
supose
x^3+y^3=z^3
3Sx-3/2x^2-x/2+3Sy-3/2y^2 - y/2 - (3Sz -3/2z^2-z/2)=0
or
2Sx-x^2-x/3+2Sy-y^2 - y/3 - (2Sz -z^2-z/3)=0
or
2Sx+2Sy-2Sz-(x^2+y^2-z^2) =(x/3+y/3-z/3)
because
2Sx+2Sy-2Sz-(x^2+y^2-z^2) is integer
so
(x/3+y/3-z/3) is also integer
or
x=3k
y=3h and
z=3g
K,h,g are integers
So
27k^3+27h^3=27g^3.
or
k^3+h^3=g^3
had had condition x ^ 3 + y ^ 3 = z ^ 3
Unable to meet the two conditions in the same time
except
x=k,y=h and z=g
but
x=3k
and
k=x
so
x=3x
this is impossible
conclusive
x^3+y^3=/z^3
general
Z^n=/x^n+y^n
using formular
1^a+2^a+3^a+4^a+....+n^a
Thank you very much
You had written
How can you assert that 2Sx+2Sy-2Sz-(x^2+y^2-z^2) is integer ? :)
2Sx+2Sy-2Sz-(x^2+y^2-z^2) is integer because
Sx=1+2^2+3^2+....+x^2 so it is integer. Similar with Sy and Sz. And condition give x,y,z are integers
Old writing have mistake. I am sorry. . I write again which have no mistake. Please read it.
Define
Sx=1+2^2+3^2+4^2+....+x^2.=x(x+1)(2x+1)/6=(2x^3+3x^2+x)/6
Sy=1+2^2+3^2+4^2+....+y^2=y(y+1)(2y+1)/6=(2y^3+3y^2+y)/6
Sz=1+2^2+3^2+4^2+....+z^2=z(z+1)(2z+1)/6=(2z^3+3z^2+z)/6
So
2x^3=6Sx-3x^2-x
2y^3=6Sy-3y^2-y
2z^3=6Sz-3z^2-z
so
x^3=3Sx-3/2x^2-x/2
y^3=3Sy-3/2y^2 - y/2
z^3=3Sz -3/2z^2-z/2
supose
x^3+y^3=z^3
3Sx-3/2x^2-x/2+3Sy-3/2y^2 - y/2 - (3Sz -3/2z^2-z/2)=0
or
2Sx-x^2-x/3+2Sy-y^2 - y/3 - (2Sz -z^2-z/3)=0
or
2Sx+2Sy-2Sz-(x^2+y^2-z^2) =(x/3+y/3-z/3)
Sx+S(x-1)+Sy+S(y-1) -Sz -S(z-1)=(x/3+y/3-z/3)
Define the function f(x) is Sx+S(x-1)
So
f(y)=Sy+S(y-1)
f(z)=Sz+S(z-1)
And g(x )is x/3
so g(y)=y^3
g(z)=z^3
So
f(x)+f(y)-f(z)=g(x)+g(y)-g(z)
homogeneous them
so
f(x)=g(x)
But this is wrong
So
x^3+y^3 impossible =z^3
I don't think you can assert that f(x)+f(y)-f(z)=g(x)+g(y)-g(z) implies that f(x) = g(x) and f(y) = g(y) and f(z) = g(z) :(
I don't think you can assert that f(x)+f(y)-f(z)=g(x)+g(y)-g(z) implies that f(x) = g(x) and f(y) = g(y) and f(z) = g(z) :(
Yes you right.
I am sorry
I think and write again completely.
Define
Sx=1+2^2+3^2+4^2+....+x^2.=x(x+1)(2x+1)/6=(2x^3+3x^2+x)/6
Sy=1+2^2+3^2+4^2+....+y^2=y(y+1)(2y+1)/6=(2y^3+3y^2+y)/6
Sz=1+2^2+3^2+4^2+....+z^2=z(z+1)(2z+1)/6=(2z^3+3z^2+z)/6
So
2x^3=6Sx-3x^2-x
2y^3=6Sy-3y^2-y
2z^3=6Sz-3z^2-z
so
x^3=3Sx-3/2x^2-x/2
y^3=3Sy-3/2y^2 - y/2
z^3=3Sz -3/2z^2-z/2
supose
x^3+y^3=z^3
3Sx-3/2x^2-x/2+3Sy-3/2y^2 - y/2 - (3Sz -3/2z^2-z/2)=0
or
2Sx-x^2-x/3+2Sy-y^2 - y/3 - (2Sz -z^2-z/3)=0
or
2Sx+2Sy-2Sz-(x^2+y^2-z^2) =(x/3+y/3-z/3)
So
(2Sx+2Sy-2Sz) - (x/3+y/3-z/3)=(x^2+y^2-z^2)
this tell that (x^2+y^2-z^2) is a funtion of [ (x/3+y/3-z/3 and (2Sx+2Sy-2Sz)]
And a other way to know x^2+y^2-z^2 follow x+y- z
because
(x+y)^2=x^2+y^2+2xy
(x+y-z)^2=(x+y)^2+z^2-2z(x+y)=x^2+y^2+2xy+z^2-2z(x+y=x^2+y^2-z^2+2xy-2z(x+y +3z^2
So
(x^2+y^2 - z^2)=(x+y-z)^2+2xy-2z(x+y +3z^2
This tell that (x^2+y^2 - z^2) is a function of [ (x+y-z)^2 and 2xy-2z(x+y +3z^2]
(x^2+y^2-z^2) is a funtion of [ (x/3+y/3-z/3 and (2Sx+2Sy-2Sz)]
And
(x^2+y^2 - z^2) of [ (x+y-z)^2 and 2xy-2z(x+y +3z^2]
Can not satify two conditions in a same time.
note
first function have no xy,zx and zy
Second funtion have
Well, I think you're not very sure of your results, trying this and that approach. If you think you are really in the verge of a major result (which would be astonishing, I should say) I advise you to work on that proof carefully and not just throw attempts. ;) This is not a try/error endeavor, or at least not in a youtube comments box, were typically people doesn't have so much free time to work on partial and not so thought results. But hey; go for it.
If anyone has a link to the song, I'd really appreciate it if you could post it here
Prof.Wiles is a great mathematician.
2:57 man, for a blink moment I thought it was him, thinking like "how could one man possess so much awesomeness"... guess he's awesome enough already. :D
2:56 what he does here is just as impressive as well as the proof though
Is that him?
no
Isso que é nível máximo da matemática
sir andrew wiles genio de las matematicas, un hombre admirable............mis mas grandes respetos
O revolvedor de problemas do entretenimento
What's the music piece called?
Andrew wiles real genius
But i just prove fo happy in math
Please read it, that is a short message about Flt
Define
Sx=1+2^2+3^2+4^2+....+x^2.=x(x+1)(2x+1)/6=(2x^3+3x^2+x)/6
Sy=1+2^2+3^2+4^2+....+y^2=y(y+1)(2y+1)/6=(2y^3+3y^2+y)/6
Sz=1+2^2+3^2+4^2+....+z^2=z(z+1)(2z+1)/6=(2z^3+3z^2+z)/6
So
2x^3=6Sx-3x^2-x
2y^3=6Sy-3y^2-y
2z^3=6Sz-3z^2-z
so
x^3=3Sx-3/2x^2-x/2
y^3=3Sy-3/2y^2 - y/2
z^3=3Sz -3/2z^2-z/2
suppose
x^3+y^3=z^3
3Sx-3/2x^2-x/2+3Sy-3/2y^2 - y/2 - (3Sz -3/2z^2-z/2)=0
or
2Sx-x^2-x/3+2Sy-y^2 - y/3 - (2Sz -z^2-z/3)=0
or
2Sx+2Sy-2Sz-(x^2+y^2-z^2) =(x/3+y/3-z/3)
So
(2Sx+2Sy-2Sz) - (x/3+y/3-z/3)=(x^2+y^2-z^2)
this tell that (x^2+y^2-z^2) is a function of [ (x/3+y/3-z/3 and (2Sx+2Sy-2Sz)]
because
(x+y)^2=x^2+y^2+2xy
(x+y-z)^2=(x+y)^2+z^2-2z(x+y)=x^2+y^2+2xy+z^2-2z(x+y=x^2+y^2-z^2+2xy-2z(x+y +3z^2
So
(x^2+y^2 - z^2)=(x+y-z)^2+2xy-2z(x+y +3z^2
This tell that (x^2+y^2 - z^2) is a function of [ (x+y-z)^2 and 2xy-2z(x+y +3z^2]
Had had first
(x^2+y^2-z^2) is a funtion of [ (x+y-z)/3 and (2Sx+2Sy-2Sz)]
and more have another function
(x^2+y^2 - z^2) is a funtion of [ (x+y-z)^2 and 2xy-2z(x+y )+3z^2]
note
first function have no xy,zx and zy
Second funtion have.
It point out that (x ^ 2 + y ^ 2 - z ^ 2) is not only followas the (x, y and z) but also (x ^ 2 + y ^ 2 - z ^ 2) acording individual x.
Cannot satisfy two functions different in a same time on this case.
I love you ♥️
He looks exactly like a scholar
By little creature, I assume he means a cicada!
He literally said it in the video lol.
@@backupaccount9263 i didnt heard it
@@xxnotmuchxx 1:35
Nice style
2:30
If I was him, I would be convinced I'm god himself. He's so down to earth, respect.
He knows mankind cannot reach far with an egoistical mind.
@@RoadMLin STEM/philosophy fields you cannot.
In other fields... Not so sure.
Please don't tell me this was the full short film...
If one has a too good a memory, than one becomes a logician/philosopher
He is a very intersting scientist
Ah bell
Is it possible to have 3 or 4 minutes with this man and not have some major insight into the world?
Who the fuck disliked this
The Universe has a prime-cofactor quantization superposition cause-effect format, with/to which we respond by/to recognise mathematical concepts, altogether.
Nice Hair
Seems like a nice guy but needs to see the inside of the dental office
Good teeth